Publication result detail

Convenient adjacencies on Z^2

ŠLAPAL, J.

Original Title

Convenient adjacencies on Z^2

English Title

Convenient adjacencies on Z^2

Type

WoS Article

Original Abstract

We discuss graphs with the vertex set Z^2 which are subgraphs of the 8-adjacency graph and have the property that certain natural cycles in these graphs are Jordan curves, i.e., separate Z^2 into exactly two connected components. After considering graphs with the usual connectedness, we concentrate on a graph with a special one.

English abstract

We discuss graphs with the vertex set Z^2 which are subgraphs of the 8-adjacency graph and have the property that certain natural cycles in these graphs are Jordan curves, i.e., separate Z^2 into exactly two connected components. After considering graphs with the usual connectedness, we concentrate on a graph with a special one.

Keywords

Digital plane, adjacency graph, connectedness, Jordan curve

Key words in English

Digital plane, adjacency graph, connectedness, Jordan curve

Authors

ŠLAPAL, J.

RIV year

2015

Released

01.05.2014

Location

Nis

ISBN

0354-5180

Periodical

Filomat

Volume

28

Number

2

State

Republic of Serbia

Pages from

305

Pages to

312

Pages count

8

BibTex

@article{BUT104903,
  author="Josef {Šlapal}",
  title="Convenient adjacencies on Z^2",
  journal="Filomat",
  year="2014",
  volume="28",
  number="2",
  pages="305--312",
  doi="10.2298/FIL1402305S",
  issn="0354-5180"
}